Conjugating by singular operators: On the boundedness of similarity transforms near singular points

Abstract

We consider the question of, given operators A, Z and a sequence of invertible operators Un Z, whether the sequence UnAUn-1 is bounded in norm, as well as generalizations of this where UnAUn-1 is modified by some bounded linear map on bounded linear operators. In the setting of Hilbert spaces, we provide a complete classification in terms of algebraic criteria of those A for which such a sequence exists, as long as Z is of generalized index zero, which always holds in finite-dimensional contexts. In the process, we prove that particular coefficients arising in inverses of certain good paths going to Z can also be classified in terms of an entirely algebraic criterion.

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